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Lecture 17 Gravitational Waves-Black Holes

Lecture 17 Gravitational Waves-Black Holes. ASTR 340 Fall 2006 Dennis Papadopoulos. THE GENERAL THEORY OF RELATIVITY. Within a free-falling frame, the Special Theory of Relativity applies. Free-falling particles/observers move on geodesics through curved space-time

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Lecture 17 Gravitational Waves-Black Holes

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  1. Lecture 17Gravitational Waves-Black Holes ASTR 340 Fall 2006 Dennis Papadopoulos

  2. THE GENERAL THEORY OF RELATIVITY • Within a free-falling frame, the Special Theory of Relativity applies. • Free-falling particles/observers move on geodesics through curved space-time • The distribution of matter and energy determines how space-time is curved. “Space-time curvature tells matter/energy how to move. Matter/energy tells space-time how to curve.”

  3. GRAVITATIONAL WAVES • Particular kind of phenomena (e.g. orbiting stars) produce ripples in the space-time curvature… • Ripples travel at speed of light through space • These are called gravitational waves.

  4. Features of gravitational waves… • Usually extremely weak! • Only become strong when massive objects are orbiting close to each other. • Gravitational waves carry energy away from orbiting objects… lets objects spiral together. • The grand challenge – to compute the spiralling together of two black holes. • How do we know that these waves exist?

  5. The binary pulsar (PSR1913+16) • Russell Hulse & Joseph Taylor (1974) • Discovered remarkable double star system • Nobel prize in 1993 From Nobel Prize website

  6. Two neutron stars orbiting each other • One neutron star is a pulsar – • Neutron star is spinning on its axis (period of 59ms) • Emits pulse of radio towards Earth with each revolution • Acts as a very accurate clock! • Interesting place to study GR • Orbit precesses by 4 degree per year! • Orbit is shrinking due to gravitational waves

  7. Very precise test of certain aspects of GR

  8. Direct detection of gravitational waves… • How do you search for gravitational waves? • Look for tidal forces as gravitational wave passes • Pioneered by Joseph Weber (UMd Professor) • Estimated wave frequency (10000Hz) • Looked for “ringing” in a metal bar caused by passage of gravitational wave. • Weber claimed detection of waves in early 1970s • Never verified – but Weber held out to the end…

  9. Tidal Effects Differences between accelerating and gravitational frames – Non locality

  10. Modern experiments : LIGO • Laser Interferometer Gravitational Wave Observatory • Two L-shaped 4km components • Hanford, Washington • Livington, Louisiana

  11. Will become operational very soon! • Can detect gravitational waves with frequencies of about 10-1000Hz. • VERY sensitive… need to account for • Earthquakes and Geological movement • Traffic and people! • What will it see? • Stellar mass black holes spiraling together • Neutron stars spiraling together

  12. LISA • Laser Interferometer Space Antenna • Space-based version of LIGO • Sensitive to lower-frequency waves (0.0001 – 0.1Hz) • Can see • Normal binary stars in the Galaxy • Stars spiraling into large black holes in the nearby Universe. • Massive black holes spiraling together anywhere in the universe!

  13. SPACE TIME STRUCTURE – THE METRIC EQUATION Metric is invariant f, g, h Metric coefficients sphere 2D space-time metric

  14. Black Holes

  15. Gravitational Collapse 1000 km 100 km

  16. Degeneracy pressure

  17. OLD IDEAS FOR BLACK HOLES • “What goes up must come down”… or must it? • Escape velocity, Vesc • Critical velocity object must have to just escape the gravitational field of the Earth • V<Vesc : object falls back to Earth • V>Vesc : object never falls back to Earth • In fact, escape velocity given in general by when the mass of an object is M and the distance from the center is R • Starting from Earth’s surface, Vesc=11 km/s • Starting from Sun’s surface, Vesc= 616 km/s

  18. 18th Century ideas • By making M larger and R smaller, Vescincreases • Idea of an object with gravity so strong that light cannot escape first suggested by Rev. John Mitchell in 1783 • Laplace (1798) – “A luminous star, of the same density as the Earth, and whose diameter should be two hundred and fifty times larger than that of the Sun, would not, in consequence of its attraction, allow any of its rays to arrive at us; it is therefore possible that the largest luminous bodies in the universe may, through this cause, be invisible.”

  19. Escape Velocity

  20. MODERN IDEAS • Karl Schwarzschild (1916) • First solution of Einstein’s equations of GR • Describes gravitational field in (empty) space around a point mass • Space-time interval in Schwarzschild’s solution (radial displacements only) is • Features of Schwarzschild’s solution: • Yields Newton’s law of gravity, with flat space, at large R • Space-time curvature becomes infinite at center (R=0; this is called a space-time singularity) • Gravitational time-dilation effect becomes infinite on a spherical surface known as the event horizon, where coefficient of t is zero • Radius of the sphere representing the event horizon is called the Schwarzschild radius,Rs

  21. Schwarzchild Radius Rs

  22. Event Horizon

  23. Time Dilation-Length Contraction-Red Shift At R=Rs solution breaks down – In reality not. Failure of the coordinate frame

  24. For a body of the Sun’s mass, Schwarzschild radius • Singularity – spacetime curvature is infinite. Everything destroyed. Laws of GR break down. • Event horizon – gravitational time-dilation is infinite as observed from large distance. • Any light emitted at Rs would be infinitely redshifted - hence could not be observed from outside

  25. More features of Schwarzschild black hole • Events inside the event horizon are causally-disconnected from events outside of the event horizon (i.e. no information can be sent from inside to outside the horizon) • Observer who enters event horizon would only feel “strange” gravitational effects if the black hole mass is small, so that Rs is comparable to their size • Once inside the event horizon, future light cone always points toward singularity (any motion must be inward) • Stable, circular orbits are not possible inside 3Rs: inside this radius, orbit must either be inward or outward but not steady • Light ray passing BH tangentially at distance 1.5Rs would be bent around to follow a circular orbit • Thus black hole would produce “shadow” on sky

  26. Photon Sphere

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